Perimeter Length and Form Factor of Two-Dimensional Polymer Melts

Abstract

Self-avoiding polymers in two-dimensional (d=2) melts are known to adopt compact configurations of typical size R(N) N1/d with N being the chain length. Using molecular dynamics simulations we show that the irregular shapes of these chains are characterized by a perimeter length L(N) R(N) of fractal dimension = d-2 =5/4 with 2=3/4 being a well-known contact exponent. Due to the self-similar structure of the chains, compactness and perimeter fractality repeat for subchains of all arc-lengths s down to a few monomers. The Kratky representation of the intramolecular form factor F(q) reveals a strong non-monotonous behavior with q2F(q) 1/(qN1/d)2 in the intermediate regime of the wavevector q. Measuring the scattering of labeled subchains %(s F(q) L(s)) the form factor may allow to test our predictions in real experiments.